WEDNESDAY, 18 MAY 1.00 PM 1.35 PM. Scottish candidate number

FOR OFFICIAL USE X100/101 Total Mark NATIONAL QUALIFICATIONS 2011 WEDNESDAY, 18 MAY MATHEMATICS 1.00 PM 1.35 PM INTERMEDIATE 1 Units 1, 2 and 3 Paper 1 (Non-calculator) Fill in these boxes and read what is printed below. Full name of centre Town Forename(s) Surname Date of birth Day Month Year Scottish candidate number Number of seat 1 You may NOT use a calculator. 2 Write your working and answers in the spaces provided. Additional space is provided at the end of this question-answer book for use if required. If you use this space, write clearly the number of the question involved. 3 Full credit will be given only where the solution contains appropriate working. 4 Before leaving the examination room you must give this book to the Invigilator. If you do not you may lose all the marks for this paper. Use blue or black ink. Pencil may be used for graphs and diagrams only. LI X100/101 6/18010 *X100/101*

FORMULAE LIST Circumference of a circle: C = πd Area of a circle: A = πr 2 Theorem of Pythagoras: c b a 2 + b 2 = c 2 a Trigonometric ratios in a right angled triangle: hypotenuse x adjacent opposite tan x sin x cos x = = = opposite adjacent opposite hypotenuse adjacent hypotenuse [ X100/101] Page two

ALL questions should be attempted. 1. (a) Find 6. 47 + 13. 9. 5 (b) Find of 360. 8 1 (c) Find 12 13. 1 1 [Turn over [ X100/101] Page three

2. An overnight ferry left Lerwick at 1745 and arrived in Aberdeen at 0720 the next morning. How long did the journey from Lerwick to Aberdeen take? 3. Work out the answer to 17 4 ( 2). 1 2 [ X100/101] Page four

4. (a) On the grid below, plot the points P( 7,2) and Q(5, 6). 10 y 10 10 x 10 1 (b) Draw a line joining P to Q. The point R is halfway along this line. Write down the coordinates of R. 1 [Turn over [ X100/101] Page five

5. The fare charged by a taxi firm is: 3 for the first 500 metres of a journey plus 50p for each additional 500 metres. (a) Find the fare charged for a journey of 1500 metres. (b) The fare charged for another journey is 7. What distance is the journey? 2 2 [ X100/101] Page six

6. Solve algebraically the equation 7p 2 = 54 + 3p. 7. (a) Complete the table below for y = 3x 2. 3 x 2 0 3 y (b) Draw the line y = 3x 2 on the grid. 2 10 y 10 10 x 10 2 [Turn over [ X100/101] Page seven

8. Thirty students were given homework. The frequency table shows the length of time each student spent on the homework. Time (minutes) Frequency 5 1 10 6 15 11 20 7 25 5 Total = 30 (a) Write down the modal time spent on the homework. 1 (b) What is the probability that a student, picked at random, spent 20 minutes on the homework? 1 (c) Complete the table below and find the mean time spent on the homework. Time (minutes) Frequency Time Frequency 5 1 5 10 6 60 15 11 165 20 7 25 5 Total = 30 Total = 3 [ X100/101] Page eight

9. Margaret has 200 worth of gift vouchers for a jewellery shop. She wants to buy some of the items shown below. Bracelet 105 Pendant 80 Earrings 55 Bangle 50 Charm 30 Margaret wants to buy three items. She can spend a maximum of 200. She does not want to buy more than one of each item. One combination of three items that Margaret can buy is shown in the table below. Bracelet 105 Pendant 80 Earrings 55 Bangle 50 Charm 30 Total Value ( ) 185 Complete the table to show all the possible combinations of items that Margaret can buy. 3 [Turn over for Question 10 on Page ten [ X100/101] Page nine

10. Each card in a pile has a number printed on it. (a) Seonaid selects these six cards from the pile. The number on the last card is hidden. 6 3 4 1 4 The range of the numbers on the six cards is 8. Find the hidden number. (b) Kirsty selects these six cards from the pile. The number on the last card is hidden. 1 7 8 2 8 1 The mean of the numbers on the six cards is 5. Find the hidden number. 2 [END OF QUESTION PAPER] [ X100/101] Page ten

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FOR OFFICIAL USE X100/103 Total Mark NATIONAL QUALIFICATIONS 2011 WEDNESDAY, 18 MAY MATHEMATICS 1.55 PM 2.50 PM INTERMEDIATE 1 Units 1, 2 and 3 Paper 2 Fill in these boxes and read what is printed below. Full name of centre Town Forename(s) Surname Date of birth Day Month Year Scottish candidate number Number of seat 1 You may use a calculator. 2 Write your working and answers in the spaces provided. Additional space is provided at the end of this question-answer book for use if required. If you use this space, write clearly the number of the question involved. 3 Full credit will be given only where the solution contains appropriate working. 4 Before leaving the examination room you must give this book to the Invigilator. If you do not you may lose all the marks for this paper. Use blue or black ink. Pencil may be used for graphs and diagrams only. LI X100/103 6/18010 *X100/103*

FORMULAE LIST Circumference of a circle: C = πd Area of a circle: A = πr 2 Theorem of Pythagoras: c b a 2 + b 2 = c 2 a Trigonometric ratios in a right angled triangle: hypotenuse x adjacent opposite tan x sin x cos x = = = opposite adjacent opposite hypotenuse adjacent hypotenuse [ X100/103] Page two

ALL questions should be attempted. 1. Sohail burns off 160 calories when he runs for 20 minutes. For how many minutes would he need to run to burn off 400 calories? 2. Solve algebraically the inequality 7c + 13 < 55. 2 2 [Turn over [ X100/103] Page three

3. A factory produces 4000 widescreen televisions each valued at 950. Calculate the total value of the 4000 televisions. Give your answer in standard form. 3 [ X100/103] Page four

4. Jack and Jill travel from Edinburgh to Birmingham. Jack travels by train and Jill travels by aeroplane. The graph below shows their journeys. Distance from Edinburgh (miles) 300 200 100 Jill Jack 0 1pm 2pm 3pm 4pm 5pm Time (a) How much sooner than Jack does Jill arrive in Birmingham? 1 (b) Calculate the average speed, in miles per hour, of Jack s journey. 3 [Turn over [ X100/103] Page five

5. (a) Multiply out the brackets and simplify 5(2m + 7) m. (b) Factorise 24 18k. 2 2 [ X100/103] Page six

6. This empty tank is to be filled with water. 50 cm 90 cm 60 cm The tank is a cuboid, 90 centimetres long, 60 centimetres wide and 50 centimetres high. The water fills at a rate of 15 litres every minute. (1 litre = 1000 cm 3 ) How long will it take to fill the tank? 4 [Turn over [ X100/103] Page seven

7. The pie chart shows the share of the votes received by candidates in the Gleniston constituency at the general election in 2005. LABOUR 220 61 SNP 11 OTHERS 25 CONSERVATIVE LIBERAL (a) A total of 30 960 people voted in the Gleniston constituency. How many people voted for the Liberal candidate? 3 [ X100/103] Page eight

7. (continued) The pie chart below shows the share of the votes received by candidates in the Gleniston constituency at the by-election in 2008. LABOUR 140 138 SNP 11 OTHERS 25 CONSERVATIVE 46 LIBERAL (b) Describe the differences in the share of the votes received by candidates in the by-election in 2008 and the general election in 2005. 2 [Turn over [ X100/103] Page nine

8. Last year Mark rented a villa in Spain in April and October. In April the villa cost him 800. Exchange Rates In October it cost the same number of euros as it did in April. How much, in pounds and pence, did Mark pay in October? April 1 = 1 33 October 1 = 1 07 3 [ X100/103] Page ten

9. A flagpole snaps and falls over into the position shown. height 2 4 m 4 5 m Calculate the height of the flagpole before it fell over. Do not use a scale drawing. 4 [Turn over [ X100/103] Page eleven

10. Joe borrows 1400 from a bank. The rate of interest is 7 5% per annum. Calculate the interest he must pay after four months. 3 11. Use the formula below to find the value of P when m = 360 and t = 0 45. P = m 2t 3 [ X100/103] Page twelve

12. Calculate the height, h metres, of the trapezium shown below. Do not use a scale drawing. 11 metres h metres 49 17 metres 4 [Turn over [ X100/103] Page thirteen

13. Alysoun bought a mobile phone for 125. She sold it a few months later for 80. Calculate her loss as a percentage of what she paid for the phone. 4 [ X100/103] Page fourteen

14. A badge showing a clown s head consists of a semi-circle and a triangle. 1 5 cm 2 8 cm Calculate the area of the badge in square centimetres. Give your answer correct to one decimal place. 5 [END OF QUESTION PAPER] [ X100/103] Page fifteen

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